Vorankündigung 43. Berliner Steuergespräche
Vorankündigung zu den 43. Berliner Steuergesprächen![src=data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJ8AAABUCAIAAAATVnLAAAAgAElEQVR4nO29eXBVR77nmSAMGIxddpcxNngpu7xUTU%2B/NzMx74%2BemJiInp6IiY6Y6eiOqn61umyXN2wjofVe3UXgpbyxCm1ICBCLDMYLOxJCukISmMV4YxUggRBCIAkJLXc55%2BTJ/MwfeY6Qq6I7Hn6v56EXlZFxQ7o6Ovee/Gb%2B8rd9fym4lSYhAQlAg1YuUuOgHKREKhQuuOY6R6EVqFu6/%2B3WNLg4LhZItESCBFehJUgXRyIlyvUvxQX9z/2lxzRxS1e7mAcFBa7S30MXFDbY3l8B5aK0mQnjs7soF%2BnigET7k1eBViBdpEFX8y8CXa8psM3qlCBREleh0JCAuP%2BMFqRQNkqO/%2B5BNgo7gNLe9PX/akTV%2BEZXK1yFo3AUSI1CK/NIo3LboGvWsUS547sztv/Z4vYh/TPgb5d2a%2BhqjDSWZtXaKAvl3pRj2EYku2Z/8ufyuO7%2Bo8mb83WMAPYuUz7Mt5eecatr199rkRploVJjHtgMARitCrNbeQCP61fQIMECy39eb69Vo9uw0kjXe%2BDbpd0yumiJclASrVx/Otve9mu0aIlWKIUyQlvBuH3VanRBmoe1RuWTgfbmQlYSKc1Wddu0W0RXK1yJlLgK7c1oX7OSLo725vfosh3/3VUob2lKpI00mhTKF1YSNBplI%2B1xji64alT86DHQKlLaU5mTrkoonLFqCOPzFcBxUcqVKbA0lkMcLK0slLqpXmhjK3payO3Tbh1dDcrD1d9rlYsDSYij49oZ0kgbUsY41p7RME67mc8apXE0SVsOQAJt4froqlF0sUato9uj3arO7G0/xvLx9SmpsVBD6Dgqqe2kDTdgAIaNnvXPrvf%2B0C5hUHNdkYAkrsL2JrEcQUnPKFDesMhRbeu2abds7%2Box6LreO0adTCKHtZ2U0A2d0A4X4DJ0w7Xx%2BXoFOuEyXJQMQ0pJcNBJ7DhKekq19tDVtxm0/KB9F0b9yWbGagWOqxJGIF9y%2BbfZ7z4y992H5pXMzl73YHb1rJzqB7M3jcfXOVnrHp27/N/MW/x/ZS%2B6ZCa0VjgplIWWY3EFfDX7nxqif0S7dXQluP48NXatUiA1Mokegk74acbiB0Lr7inYOSGwa2JorwjtG6d9cnDP/aHPfxrc%2BNMX32uHQUhKtGWhHLRidHqbkTFey/GtM2sFyph9uKPoKhfiiiFoh4fmlUwNfJpW0CxCB0R0/4RI4zjtEyP7RNbWe8NbH8moPAW9YJlBsG3zyMbW1xhb0cH1UL9N2q17M5AuMoWy8KeuZw6SgkFohZ8Eq6eG9ojoURE6KkLNItQwXnt436SFsTvyPn8096NvoA9cDRa4ijHeK09zNBGj8Y6uRlooG%2BVJZtdz51gwBGfhiUD1naFdInpEhA6L0P5/dgH7j%2Bh7pyzcOzXv45/kbjxhAtsSUilcqX0TyAA8Rgv5pwfpB7cfKJntm1F6L5QLJFyG4SLMnldyZ%2BDTSdFmETowITKOJfOkyF6R9fF94U8ezlhzehRdqbCk6xmEUiLHxLzHO7oSXFzQGpxRrysaEppB6IAnMpbdH9o4o6BWBPaKUIMIx8Zpnxjae29k15zQZw%2B8svIk9EPKxrE894ULZgG7ozP8XwK638uw8Z01rmP8NZck/zb7vYfnfvDgvPIHszfNyt48M2e89tnZG2a/VvR0RsnfBdaegH5IaiwX7bk7JCqOTuqbcYVxbREB4PpeRuOVBAUWOok9TCqJpge6oAMuQTf0jNt%2BDa5CF7QqemDIX7LSWAquhTuCm3RHNefbrP0QX5VBN%2BXrEBoJSdxB1BAyTiohYRhuQILRaT4%2BO1iuHHZlHIbAQWuUC1K5KIlrIeMoS0LKu3xc27vcfAj7e%2BE/SxOHERiRcsgoGskxscBx2rV2IYmKu17sz0q6wxbaNmOgHZSD9vNEsWBkNIPhdmi3hq5ZlP3QA93QBZfH9Cu%2BQDO/do3/fhX6YACuQLcvpTvhEvRAnz8UndANKRTExzG6g/C/vFb0eEb1Yxmb5mRumpW9%2Bf7czffnbro/t3pm7oZZuetm5a57MGfdnKwNc7I2zMncNDtr0%2Bzs6nHcszY9mLXlwaxPZ%2BZsmZmzaXZO1YM5VTNzq2fmbJqTVf1IxsbHMz9%2BOL360azNP0svuXy7YXur6PbCI5nVUwP1UwOxSfkxEW4S0SYRaRKRRhFpFJGYiMQmhGNTgrGpgdiUQOOUQOPkYGxS/njtaflNInRYhI%2BK8CERbpwUqp0UqhXhmAg3TsqPTQ403Jnfckdu453Bxgezq9tgaFyjexXuz60WkZgIx0Q0JhY0iYVNYkGTiLaISIuItJgfJgdapua1TAm0TA60TAo2peWP1y5CB0XkmIgeE5GDIhybFKpJC9eISExEGkU4JkIxET0iggcnhZofzK7uBAvpjl%2BtykM3Wj8hXC8i9WJBTCyMiYJGEW0S0SYRbREFB0W0JS2/ZYqP64RQowg3jtvXJhE5JKIHRaQxLVw3JX/35NBuEakX0ZiI1Itwg1hwRIS/EJEvZuVs6gYXaxzrzD0wJ2vDlGDdjLza6YHatHDthEjtpFDdpFDdBLOaFzaKBY0i3DghHBPRelFQJ6K1IlorIuPzNVIrIrVp4Zop%2BbunB7fPCGyfFtyZFq4Tkbq0yG4RrhELW0TkoIgenpmz5SqMb4uoB2ZnV08J1t%2BdWzcjr3ZyqCYtXDMlv3ZqsHZyfr0Ix8SCRrEwJsKxCeF6UVAnFtSKgloP4PHYI7UTIjVpkd1T8ndPC%2B6eHqiZGqybEI6JSP2k8E4R2SEW7hfRJhE5PCv7014wIf3bp90aut1wb94WEW2alN84ORgTkXoRrZucXzc1UD8l0Dgh1CgKmkS0aVKwaXKwUUTqRbReRGIi3Dhee6RRFMREQUxEGieEmibkHxL5h0X4qIi0pEV2ToxsFQvrRKRhQvjA7MwtA4Aaz%2Bj2wIM5Gybn187Iq5kR2D0tuHNa/rZ78z7/cc7n9%2BVsvztv55T8min5tffk1tyXs/uevO0zAtunB3ZPD%2ByeEdg5I7BzRmD39EDN9EDN9EDttEDdtEDd9Ly6GXk19%2BbuvDd3%2B915u2cEvD49UDs9UDMjsH1GcNuMwM7pgd3TAzXTgjVTgzXTgjUz8mruzq2ZkefdanrA%2B3X0gumBGu9Dg9tmBLaby2b4X%2BPuvJ135%2B2%2BJ3fnvbnb78ndOS1QNzVQPz2vbnqg1txttE8L7p6SXzMlv2ZasGZaoG5KoGlyoGVyMDY1f/eM/C13BT%2B6K7xtamDrj/J2PT2vahDP5X77tFtDdwj%2B17lLn55X9dS8dU9mVD2ZUflUxsqfpxf96/TCv8le%2BdhrhT/JqXoka93sVyt/lrnhmddLn5lX%2BlT22kfTy/51TsVT6cVPzl/5xPzKJ%2BaveWz%2BusdyP3kwvfrJnE%2BfmFvxP7267O/eWPGzuSU/m1/5dObKJ%2BevfCR93aPzVv8sp/CZrEU/nV/8eEb545mVj2ateTCnak521dPplT9/o/LJjKrHMqsem7/uiYyqn79R%2BXR65Zzsqgdzqh7NWvN4ZuXjGeU/nV/8TNain%2BUUPjpv9SPp656cv/LpzOJn5pf%2BLL3kmddLfv7a8r9LL/ybeaUPZ2yaNX/ro%2BmbnkivfuS1ymdyqh/JWDNnXsUzueseebXkqflrn5635ufzKp5Kr5qT9cmP0zc8lVv5ePrSx3PL5qQXPZG7%2BievlfzNvNJ/N295r3u7hXdvEV0LeuAitMF5OA/tftbgBTgHp%2BEUnIaz0AGdcNz/%2BTJchHPQCq1wDI7DKWiHa9ALHXAG2uAcnIJWOO//Vxu0QSt8ByehE7r8d1qhzXchnYTv/Hfa4CJchvPQCqfgnP9%2BG7TDZbgGPXAKvoGTcB7a4Iz//c1l531X1EX4Dr6Ds9AJZ%2BHkmE8/H2cYRlzGcba6hCG47nscr8MNiKOTuAkYgmvQIemHIbBh0KEfBmDIdhWOBXEYQN2AfuiFTujz3uSq794zqaZ9MKK0i2PDiCYJQ9AL/b77ehCuw3UYBAcs/55DkIQRbULPzojSfXAFrvkXdMMVGATbTbg4/XAZ%2BqEfhtFxP0bSYzEECfOrUnHtuR6HUyOa1Aj0Qx90mweEG0rdbpGiW85Wt1EpVMJ/bONbd3FS0C25Osbn3Ad9cBk6zIx241oOG76GJhl3BpLYg3AZeuAStI5Z8ebVAtcdVq6DxiSG2yiJRFkoS%2BP41B3HvCOR9ij/R6Ncx3WHLf%2BGl6FzjNS5BBoLeSOpTbzL8QMhSaTlSBLQ78uJPh/Iqyas68bRXnpGCuIaGzVo9etxbe/6tDc5mg5oQQqGoAv%2BXe6KR15a9tC8tbOyN8/O%2B%2BT%2BeWvnZG2Yk7n57/I3Xv4zYqSjUUpCJ/wf2YuemrfkJ/lrHyj4ZEbehlm5a2ZlVMycu%2BpvcyvPwqBhJvmsFp8fLJESv2wDKKTElaMXuB5lgEE4C3%2BbW/nj11bNyqh4MKfqx7mf3p25eUb6qn8TLOlSXiqR4xpGgSPdlELbMADfwc%2BzFt0f3Tgj8vH9gTUPZVU89Ebl3%2BWsvmyhNakEqQRKjsYKHRjBGritfJG3jq7ywl74mRop6Ic2%2BOlLix7K3fLjt5pEqEFEYiKw86639k/Krr3vldWXzRy3cBw/QyWZTFmqC342d/F9mWunL9wj3qoX%2BTsnBLfdU7DnR6Hah%2BavOw%2B9MACWHyf2UiCkMkVY/ERikMrQfcwFWmPBAFyH8/DQ/HU/CtXeU7AnLbBDBOrvWPjFpAV1M7Mru0BqXAtcLGs0XMlIin44DbODFSK8S0TrxcK90wpqpmRufeiVVVdNnuAoiUiBljI1gB7S1vXxjO5Yhqe6SZAagg74m4yimTmbJmRvFXm7xVuNYkGNCO%2BeUdA8Z97GXgB1M5LvuLgjStvd8PP0wvvytoi8naKgfuJbLZPyY3eHmu/Kjs1%2BfXMnJMBy/MTpMcQ0IwfcUWEgv/9XB1xSDgnohNmvb74rO3Z3qHlKoHFS8OCU6CERrrkvq6LL/HvKCISkYkjJGygHSUpzHuakF9%2BxsF4UNIvQnrtCu%2B/J3v7UvHX9oC3cQYcRB6k0jiKVkkbZuL2iRD8oJ3IswdVH9xz8z9mrfpRRPTlUM/HtAyK6T0R3iYV7RfbeJ/I%2B7dKAo5TSII3iYd0A2QE/z6q4O2%2BnCMfEmy0iv14EG6fmH5weaH48Z1sHWBolfcDk6HJRY5PFXfD54P48cG4mFXTA4znbpgeap%2BYfnJjXMin34B3hg6Jg38zIxotmf3ZAKUlCMgJxUsM4aEU7/Dy4dkJgt4g2i9Duqfnb78z8/Jmc6qtqzGzTSFwbZSOTMjG%2BPZEmLy4xyt70t94BaIdn3ij/V9lbJ4f3i1CLWHhQFNSLSL0IN83K3nwVFLYR44Y8iJYOXITH51dNydsnIodEpEVEm0S0UUQaRGjfQ3mbOsZm%2BisHbcS6MpkSY5Q7ww33BaWXMqE02NABD%2BVtEqF9ItIgwk2Tgi0Tg/tFdN%2BPwtXto5mqynwxZWOjwUJqLsJjWRVp4RqxoEG8WSPCn98R3TE7p6prNHtZMapYWfjFM24npfmW0U1BfAy60ke3DZ6at%2Bre7B13hFtE6Aux8IiINopoTESbfpy3qRskKekbG6amlaNph8czNkzJaxDhwyLaJAoaxYJGUdAgInsfCG7oABulzcrVFnqUvaNspOV/DctT3SWAVmgHbYGjkTaqAx4IbhCRvaKgQRQ0poViE/P3iYK994arL4xmdrrerLXNZm5hQxs8mlUxOVQjojGxsEZEtk4o2DUzd12HNzu9jDJr9Ink7bZ0f6DO7PjDnUQ74CWpPzWv/O6cHRMjB0XksHjzqChoEgX1oqD%2BvmBVFyiGwfEKabhgo1064cn0ddPyakS4SUTrREGdWNgoFuwX0YaZwepL4HrLUXqcf18eesqU%2Bn5lndELlGF8KBd1CWYGq0W0QSzYLwoa08I1aaEdIrpjZn5VF56RZ0SEC9roE7ay4Cw8mr1yRl7txMCBO6L1IrR7YrR2Zu6GTg9dBY6LZePYZrcZ9%2BiafVebEigWbhJlgYp76JbdnbttQrRFRA%2BKtw6JBfWioFZE6%2B7Pq%2BoGzTBYWmvtablIRQc8mb7urtw9E8KxCSbuVtAoIvtFZN%2BswIYrMCY1T43Vp3wD%2BC/QNbqVUqODfQVmBapFZJ%2BI7BfR2KTwzjtCW0Vkx6xg1RWMPQSOd09t/teRKTgPj2euvCen7o68L%2B6IxERoz4To3vtzqzuMPNcSkpoRSVySBAepzH1un3br6I5VqVyFUhqGoA2ezCidkbd1YkFMRBrEmzFRsDMtsn1yft2crOoeUCQ0jhGaRqobStlj89fNyNkzKT82Ob9%2Bcn79pPxYWrAhLb/mkdyqPjCiV2NpHI0ctcESfhU7F2WjEqjRKmh%2BFQQvLbMPHsmtSsuvSQs2TM6vnxasmRLclZZfMytQ3ekruNoXsI7BRkrLzNeMynty6kR%2Bs1gQE5E9YuG%2BewObLnq7tUJbkHRJSpOzb2TA%2BF27GrT%2Bfu0trVwYgPPw04yyGXlbJ0b3i3CjWLA/LbJzcmjn1EDskfmbe0BhaxyJM1oX6DqchEey1t2Vt2tSfiwtFJuUH5scbJwcaLgjWPNYzk10JZbEMfU2JSRQCRyJo3HMPRM4xrVg6njYOC6WxkJbffBYTtUdwZrJgYYpwdiUYN0dwb0T8xtm5W255GttftULD12tZMKgm77m7txakd8sFtaL6B7x5r57A5s7bu7WFiQllo38HjPjtmm3ju6o7NHSrEOJMug%2BnrFqRu6uiZFDIv8LET0yKb9%2BSrBuUrBlVvanXSCNGaFSaMeUqhuE0/BI1ro7AztExGTwtIjQQZHfLML7HgpsuAb4q9Me5eoos0YlrsSROBJXajO%2B/l9tsL3SB%2BoaPJRXLcL7RH6zCLV4ul64eWbg80vePZVX4sR4RbRyte3Jlcyqu3NrJwb3T1hQLyJ7xIKGH%2Bdu7jIf5GCyti2SCRzLoDqudWZuomsmahIsF2Ucfo9nlN%2BVt2ti5JAIHp4YPjopv3FSfmxCqGVm9qeXQaLRDm7KL2YmR6AVHs2sujO4TUTrxYJGsaBFhA%2BJ/AMiFHsob9M1PGVntITfaBUSUDgKS2KpUS6TeZXfrxl2FR4IbBKRBhE8IEImSeqACH/xQN62Lu%2BRHJTjiSJHoqTSlpl5j2ZW3Z1bMzEYm1AQE%2BE6UdB4f%2B7mboy9q3AtTdLCMmxmz69yO7UfVOP1plyWZrCH4Tz8JLP0zuDWidGmCXktd4QOiXBMROpFpHFmzuZuc52pU2fwUcSNXpq15s7gVhGtE5GYiDSJ8EGR3zwxv%2BGx7E3XuVkNahRg6YlThVQ4ylOjPKKpdElaSGuUtmW7V%2BChyMdiYdPEvKaJuQdF4LAIHp4UOfqTwK7LGtfVGkuStI2z2XJxFHY8ZSyieWum5n4ucneLyH4R2S9CDT9KX99tPCnagaRL3Dbi3MP19lKafwC6avQBvOK1ijich0eziu8MfjaxIDYxr2ly6KCIxERBnYjEZuZs6gZPV9aut/oVSQ/dymnBz0SkdkI4JsJNItwiQh66A4zOHw/U0dCFi69C6zHVs7AkQykcC2zpmLnQB3emV4hI3eRQy/TI0cnRryaGj07Ia7nv1Q29gMYmOcKNYVKWoa46oKxhxTcuT2Zv/PHbdWlvN4s3D4nIwQkFTY/kf37JRFFwIClJSqSnunvy%2Bq/o8l9HN9IiwvtFqOHh3E19eMJWjykbK/2ylF4pSmNrepTTpGbIRkp8ZcmmB34UWC/ebpgQjk0INIr8JhFumRRtnpX10VWv0ph0x2hGOuGAMwwn4H8s%2BEzMqxaBvSJ8QASbJ4QaHwttbZdobZ7dsrEk6q/o/gPRbRSRJoPu6L7rf5a3sflmrbc1aCz35vgmYch8KzehzHWXFA8v/FhEd4rArrveap76zgER3CNCux%2BPbvF8VSjbiktTA9ALTjgD8C3MfqPsgYU1099smhQ9IPJik3L3PZxe3WMMB3CR0sjzv6L7D0U33CTCMRHeNytQfcX7FP9z9U3vrl9N1XGJayzfrZGEEU%2B9cjw53gMP5625I7p1Uu5nU/I%2BTwt%2BJoJbpkQ/eThQ3uX5JXyviIttGW%2BrfRnZCk9nlc/M2Twl4/PJmbtn5NXNym/46dyqAUiMaLzlK2FMNFD/dd/9h6Ab2fdAsLrrewbYzaqb2gsbKBdHMuKS9BXmJDp%2BE904KkUf3P/Suz9e8PGDBZ/el7Phnry1Mxduun/hxvtfWdADtuOq1OhxFjiOSUYYNhHrJ19%2B94mcDbOyNz8Y3PFg3vaH5n/y9ItFQ%2BDK0e8ivXqvni30V3T/6%2BgaiocIe1GELk9lNmasGt1y8Q6jUBLHIm6R9JMRk5A0apeUaI2EHvh51ocPZC17NLvkydzSJ3NLH88unJ25%2BG/mv3XdPI7J5EiARGvirrZIxVGtDv8%2Bb9nP0pc9kVU%2BJ7NidnrFY/PK/8/81R1DN6MpFo6xxX2VflxX8IX/3uhOCDWKUIMI750V2OCv3b9EF9dbu1KSlFh%2BNRJLY1l%2BPF6DpRiAU/A1nPT7KT9TMw7KTXl6so0zaLuQRGuSEmfIT/Q8CV%2BPyZu0AVQK4igLx0Sr/Jrr47nGK/D/B7r59WnR%2BpmZa3rMp2iz2WpvydhGsVIJ26SoOcpKeDqzK9EyIaX04gFoV8Vd%2BqAXrjoMwYCfE3kdpHHIOKY2hMYlKUniQhx3xIV%2Bm0E/jfIy9I4WNUqOaJREKW2BlC6OMzo4t1G77dCdFNqfFopNWRCbNX9NDyjpuq6rcKWUgGujNHHlWuBo5bqum0yOtZOQ0h3VlWyv8ps0ZpOLm0QrP5HR1RDX7uBoPpB0tVftxR1Gxc2DOg42DEMc4g6pIYltYY/YdspFebEMjWODJjE0eFu5q247dEV%2BLC0Um1oQm51Z1cdNR1XSzxpI%2BGPtQajBRTm%2Byesq26/1Z1mWLS1QynawtPGD6CHpTQXlwJBiyMTtLRhSchC6Ejcgjpu045a5fyo5LHEk0rPGbvQi4ybYBY6bihs7TUl3nNd4hf/%2B6DaIUMPkSP2crA0GXRv63OQgdMhkn58p3e%2BpQQxIhmEYBpTnxupF9uDG/YzXYZNxYXbuRBIJcRcbpJWKX5HEB6APOqU1AD3QDxpLy7j0PkJZOIPEe90BCaBkakBj9cMVdBzHRl13ZRxu2JalndsJ3NsMXRFuFAUtIrp/Yv4%2Bg66UagT1ZdeFV5e/90rJoueXf5ixZmVpU20nbgIOn2vLq1r7u6Klz69c8WLJsvQVSw9dv3IR5q5a9kbZ0hdXvP/rwnderlxW3lR7zh7qxn2nvLjly69QkHIYGYShBMn05ct2nG/vgmffLQh8VHWGVAKVwslZ8kFzZ3sXvLAkMnf1u2%2Bsfi%2BzZFFBZXG0/MPLOJu7z/%2Bhsvi14vfzKpY%2Bv/jtUHXlkRtdA57Odbu02wzdSKMoaBYF%2B0Vw75ycjX3gKgZR%2B9pOvLhykdF1G9343HWlNZfODEH96TO/KVvxJXwFJ33mzxl4oXLpjittrfA1NGA/t3JZTfeFs/Bq0eIjly45mLwDayjRPYjz4vJlWzo6W%2BG11cUvrCktOdxkZEPmmrItnWfPwivrilZfOnoSfQrdBhdQZ2HVtY5frq84DhfhLCxprg1tXtVJyvqnw%2BYf324/dKONoqBJ5O%2Bbk7e5Fy%2BdtubSmd%2BWf/gVHIFaEr%2BpXLqr%2B/wAxM6df/WjdTE4BqfG0LleKy/8vPV0K7TAfvjNimW7rnWdgJcqy7a3nukxh1loZ1jd6EP%2BoaTko%2B5rJ%2BDFdeXpuz79Tdny%2Bivt55DPVpWWdZw5Bb8qWrbuyumTPiXOUMRW91z9dfWG83AB2mHjiS%2BDa4oGx//aHdO058ZLGHQzS6fkfzZhFN1wTETrRLRuVk51L6A0WqJtczgiMOLlLlXeFfgsLVw3Kb9RhFpEwX7x1n4R3vNI3sY%2BcCTDsKv91K9XLflVddEv1hX%2Bel3R79asOI47APvbzz9XXvTLVYXPVa54btl7kcpVnZpueGXponnLlmeUlf2hvCJj6%2Bcrv/3mMOok/Lp4%2Be72tgHPOFYWqX54bmXZ%2Bu4rx%2BG3FYUfX%2B0s/e7Ll8sKD7hDf7%2BhrPL6pa/ghbUVz1cUPl%2B8JGtleVZhcW3rmQ4ov3Thl6srXllZPL%2B86A9L3y8/0HAmOThgAhjfHx79Z7/8xc6sv9fNyhn7%2Bpe3MwwZzzOr/%2BIS87/6h0fvx0Z4JRach0eySieHPhML9k/Ma5mafygtv1FE6kS05sGcdUMYRdZBJ1ySplBqP7TD/5C5/u68z%2B4I7p2We2ha%2BEuxICYW7Jz8zp5H8taYCKAFe8%2B2/nFd6RGP5GkvP9Scs35tPxy4cCq9fEUH9PrsP8MTDBSvaDh1phs%2B/vabl8uKqi%2BcOQUn4Q9lS%2Bvbzg5D0vHihgl4ZWXx2o7W4/BCReG2c2fbIOeT6tyaz36zvmzD9Utfw2/Llnx%2B6tt%2BuOHpaPTC532Xf1G5/Cx8Ee%2Bdv6FiwWcbuk1%2BtTbuKmVMJhs1LJMahWV7R2M6EpTCldI2GDhauShbO8b7ZktLex5NiXatVMKMtbId7%2BgraeMqtMlcVA5ag8cEMPeRtitTLuqHnFhzE13Xi5wbdB/OLk6LfCLerBfBpsmhgxPC9SJaKxbU3J%2B3bsCgq6Qm5ZK0sUwWdAfM%2BuWbc4Kb7gvvuG/%2BnhkZe%2B5dWDslvGVCVuWsVz%2B4DtpCQvO5tueKlp6EDuiAlYcPh6s33oDmM19nFi/p8pmf/T7vNLBk0bELHQNwBV1evyejsuQLZ%2BAE%2BrXyZQ1tZ/phGIZcrTQpmLeycNPlM63wysoV27/7the%2BcpOvrFn5yoZVK09/%2BR28uHJxQ3vrAPQaXqgmAbs7zrxcuawLOtCNvZcyypbVfPtVynM0u4aS46JG3JRluCuunyLPzU0AABDqSURBVEziKlta0hxIhnK1x3WTyrGsJEhHJkFaqRGt7FHyheO7S0xOIFoiDQUShXYd7wgOLzaqFVpq5A9B10t7GE12cUlAKzyUu1wUfCTerhHh%2BonR/aKgRry5W/ypdkpk02W8jFUHV3rnEmvDiP332cueCRbOyl46O6P4iflrfvLKyp9lrf1JoOJvA0v6wNFYtj5xoTOntOSN8hUvL383Z21pZMuW%2Bs4rcTh85nhwVfGvPiz4Q%2BWSP64v/NXyt2uunOuD0JJFTd99Z0p3drt2qGh5%2BZ7t7crKKVueVbJ03ooPs1YXvbTknaMX2oYgo3jJR6e%2BvAivly472nu1BwZh76nT80pX1F65cAVyygszVxX%2Bfsmbr1QVzltdmP7e2wk4drE98523jNdzAPa1nshb/MGZK1ckWpuEPgmahG3Z5qgbf8Q09KVGfFKK9haJOTfThZSFUti2OUXRdR0NEh13HBviuAPIfmyJSqVSRgi7I5YJaLiOiivXBhzXGRqWqeQPRZcx24CfQzM7d/nE6CbxVp3Ib0iLNIlorVhYI96umxbactk4/v1cVzNte/uH49DmchK%2BgeM%2Bj/0CfAutcMmWEgUMp5yrrjIU/UuoazAA/QnLhg6d7IDTcNzn6nfjlWSNQ69lGaJAXDMIAz71%2Bxy6E4983Y3bC%2Bae1xxnlJrss7/VEHShL3tsf7vf%2BFVcc4A2aIZd1avk4OjpWkqb51QpqZRywNIuIKWMW7Zhspv8XMdxUykb32/qLVQXLNtMBSVdx3FHfXEpI3VwNWiXeCIFIHGHUiQ1Jp9f38ybv%2BXzd79/UqUXczVZSD%2BZX3ZncFtapGVy9hd35R2bEmiZlN%2BYFqqfnbV5EEiBMkd84oJyLTRak/IrIQ9BCkYGsR1vZBMgcSxlG8fCCMQVSYVtTj1WuDDsccCdPhiCYQ8Y94bvz3IsabaTuFZxf4AMD9/wz%2BRorWnLi%2BrFLS%2B7Q7k3M%2BSTrpvQyoJhdNKMnq95aDwq91WcFEipxk7klNQSpON5usxyjzuOjrtGIb2qnGF/R7%2B5clw/EV962%2BHwUEpJSCpsGHGxvbuNJH3BoLysNW7YpLS23FtG18VxPbnj5ycqEh66q%2B4M7EiLHLwj%2B%2Bhdud9Ozjs8Odg0JVj32PzquPYCN8YYASVTcbRKJZyUyxD0kBzBNuwrrRjyKsbKLoaGcK679iD0SG9FxiUJiYQRpYehfbjfMM8cqTQMSSfuFWa1rziJFAylPApTdzIxBFfRvXANPZR0NAxrbdB1Ex5J2zi5LC93WvckRvwz8UhoNfJ9JpVxkMXHFuxWjg3xhC1h2FVxuI4a1MShH7oda2iUd6RobGvNWV3Sjpy/7MOT/b03jKhPJV1IOsqFlMuI1Jbvm2NYkoJhhcsI9IKZ1ub%2BN5T27uwinR/CI7p5brJn72qGDZc5u3xieJtY2CKChyeGj4nIQRGNieju2TlrBvDZHBqPq6IdmYprxQhsPrI/r2rFG8UfvLd53fFr3Ze083zJB89uWPqL6nd%2BU/3uG6s/nF%2B0%2BMu%2Ba43dV14oL/pt8ZKXi1fMLyvNLFx6pPtSDywsXnHifLtWKMmJk61vL1t2A7ohq6rkpVVLXly99I8lH7xRvCi4%2BMN%2B%2BPxS6%2B9KP3y9dNmbmzfMLV6SXr78O3voEu5l1244fbx099b0okUvLP9TYdPuT84eM/UYMlcV5m8of3npn/JWFWUWL8lY%2Bn4fdChry6HmBZVl6Uvee3t95YErF3pgd8fpF9cXvbSh%2BLkl72aVLV/b0tgJ5%2BDlkkVvlC3PqCicW7wk%2BtGa5Tu3dlkpNP1xpxMqTx/948qlzUM9bXDFB2zfqeMrPv04e8WSt6rXVR1qboNzMHfJB99d7IgnHDMFM4uX7%2Bw4exFeLF3y/IrFOZvWPFv4/nOL3vlwbVVf0kr9wNOVDb/VR1fDkEE3pzQt8ol4q17kN06ItoiCerGwRizYPjNvTQ%2B%2B0NGufz5zSivbhS/Otv9x6XvH0adhU9vx%2BYUfnoj3nYej2KuSp/7D6gXtcBWuwr4rl/9T2eKjcBxaocMvEJ27YunRU2eMJDvw9bfZ773bCxfhpdXL1147dQS%2BgVa4AT2wpvPUL9YVnvVjvWUnDr1esaITdnaey6oqbbx6sQPaYN35Y3%2BoXHyA4ZPwX4r/tPV6eyt8jd3uF6be0X4yY03xcZIXYUfX2dfLl3013Lezs/X/qfygGb6DhlTfb1a89/m1thPwh7WFH185%2By2chGbnxusVK/aePW0yBk7i/qr4w/mbV79SUdiKa4r37O84H60sO9B1sRsODffNqywu/KK%2BFeauKd7T3mrgvwqvrlpR1fbtN/Dc2uKP%2By4e9Uv%2BtCtnCG78IB6RV8PAGEZm7cbhNDyZVzQ9VC3CWyfmbJtWsHfy2ztFdItYuONf5VVdNkLMmGR2EpWEZMoaSWkOtnW%2BVFoU3Lt988j1Bpnsg2G4TKodZ%2BtA%2BwurFvf5e9W2r799fn1FDH0cTvrnLrTBa%2BWFTRfbTew2dvr0/OVLjAb09yXvV9%2B48CV8DRdhAAag%2Bmr7bz6p/A6%2BgrNQefTQm9XVnVDQsGP1mS8HIA7dcA7Ow0k4Bv%2Bx/P1Pr1/4vuLG9r6L/6X0/feb92zrvdCoBs9AF3x64dR/3LgsBgfgMO6vVn5YffXsN/C76uKSs0ePw3fQyNDvij%2Bou9xutLC9He2ZVRXHksPpJSsazp%2B9CoOwfs/u3YcODfpFes5K5yJ0wEsVyzdfO/ctnIVW%2BGX54s03Lp2E35Yv3dLddhq%2Bg3bo8cNoP%2Bh0ZUOD1D7EmgS0w9PZRfdGtkwrqLknWj8pa6vI2pi2cNuEyO77czZeulkVRaEd5AjENU5KMwgHBm%2B8d6Dx/y0pfHbtqlXNje3WiAnX7Lp8fu6KpXE/9f9IW%2BeLK4tf2Ljy2eJ3s9euyFzxgYHh%2BdKl%2BzovmlM391%2B4MHf5knY4Dy%2BsKf59ZeGLVaXPFS7KW1l29OyFftjQefb/Lnz3%2BYri%2BevWPL9iWcWBlrMpuwOe31C2ueuc2RFDy5ZnFC37Y%2BmSbYOdX8Jv1he/tLIwfVXpc4WLMleVHWi70AtfwW53YNGBfb9Y/PavyxYXf3Xgm%2BRI4/Wrv1pf%2BJ82Lv/96mXPli4qO9Z8Ak7Cf17xzh/XFv22bNHfl7w/75M1a05/2e7b6LlrV6355sg5WP3F/iXbPjWl3AOLPjxy/vwgXHWVAfgqXIQXS5c8t2bZ31d88GzF0t%2BvWvr8x6tKL3x7Cp4tXfLKyhW/X/xu5prynLKiQ6fPjkg96NyiVjWmbsZNT5ixiNrgyYzKu7I/F3O33RU4dG/k2OTw/qkLG6fkNTyR/flVkJqEy2DcKAdWwup3caSme9A%2BNTB8Gb6Frb3d/7n4/U%2BunTWF93d2tL9eWDwECU3S4ejZC68sWnQZurC6nSFjtHRC%2BuqyTd8eM3X7t3/3bc6qlW1wHn616J3N3xwzwsBEha/C%2Bkut6Z9s6IOvOq9mVZR/sHN7l6IHVnzZHNrxcYcjE9BjqV54dXVJ0akjx%2BFXi97ZdeRYakxceQiOYO2O95gq%2Bnt7u%2BauXFF77mzdhbbXVxefg6twSVp9frH9%2BeWFO84d74Kqrw/Mq1xR093WAYPw5bWuP5QveXZ90e9XL3vjo4oXShZvPn2sE97bsmHzkeYr6F64jN7b1nrKTnTBGyXLdp093g3dcBb1u4olG7tbz8K8iqK9ba2jgdFkwuNa3Tq6UiKd0QIzElzNEJyBJ7OqHn7v4B35B6bmHp2UfVCEm0Rw39Tcukdfr77kxc69pKRkYtDFcpEaGpqOvl1S9mXP1U5oGO59eXPlpz3nOlBdqIaOztyiVTd8xn7j19%2B9sXTZJehDDSEHZSoJ/bBk26eLd281AnP5rm2Lt316GVrRgfWrDly6OAzDNhbeSVg7r3U8%2B/47gym05tSNwaziom1Hv%2ByDxp4rLy3/4IuOSxeHRgag%2BWL7b5e%2Bt2Og8wTkV636qu2SBX2KYRPYcFn35aHAx1UnB24MwMGr3ekrlh7uurLt6JGMpR9c8UuaGbP7zNBApLQoduakUaqL9u18rWTxd/ZQP0Qqy0qO7j8FJ%2BA8LNj%2B0cov9l1E17afevfj9c2X23qgpbsjuLr042%2B/vAQ5ZYV1335lJtl1yN1QvuXiqdOo9LLCfedbzeENcUBBQiF/SM0bB9cxtt5oyQhT/%2Bf%2BV5eL%2BZtFdH9a8KDIrhfvNIm36ibnb/tpYEOXWT1aW%2BC6rvFtjFhx2yZuUXP08NsbV71U8l5wy5qqg7HzyaE4Kg4t5zoKSlZfS0gzLZpOnUhfXfar4vd/WRh8bdWf5r6/8OiF9ji0Dw2Wxva8XrH81bIly2q3HR/u74MeeGPZB8GVRW8sejdnyYeB5UsyCxdfhf2X2xcUrTDuoRHL3dbcHC5ZcWK4vw%2B%2Bvtq1ZueurPfffePdP73/SXXVV18cJ9nl3afk5aXv/rFk8eulS0KLl6bgqqs%2Bbd7/wfLSd5ev%2BHD9%2Bp3fHuuy7CPnz0eLCodNpoctU9DjOoMQWr7k6wvtxk67iB1cv/Ld7Zuar1zIKVna3Nl%2BCWncKbGzJ4NFi4/3XRmA2hPHln68Prdo0QdbNnx87KApqJZZuPi7ixdNoCKpyVryfm376Uswr3Tp88v%2BtODzjS%2BVLX5t2XvhDz4AcH9IvSqjNivX1HczZ7PCOfjfCyoezF3zQPizB7I%2BmZn50awFm6fOL7nnjbL/Lbq2S5n0GFeikvEEmsFkXAIK22ZIOoOoi8S7UcaoV27K5B32pEjAgJ2wcPtxLnjF4uRFnD5fTprpdRl1EbsHelFGYxyELpUypQz70D2o63Adtzc%2BggJb4xf9uIY74DgW9KEHPH8QvWPyQC5id8FFuAQD/pwe5f6OwA3f85WA61bSBctVNiQgbipyKCQMOvKassyJMB04/XADnYJ%2B206ZfF0Y1u4gjvnHYTwXWx9cB5MdYKccnXCk7Sbgsmv1%2B4d9n8W5CJfRCZCuvmXJrP2Cb36OpwNJc56WhI6UX7PP5Zp/olg7tNsmzekGcggcpCulsmBYYvt%2Bd40cVCNx5LBKudrGTSIdLUkZI52kjSNRKW8cZRyZckkkcCFue1EUB2mjBmTc8k46dl2URA3YI3Fs2%2BMBy35r0EZZuBI1rFLGQ4LGdd0B6JIJN%2BngYMMN9BAM4WXT3bASKSVdn3tww0pIGJaWDcPKtsAUmhgNAko/z1kpRcL1iYok4JpKDsMQakQqc0PLVcpXVDVqaGRYg9bacmztq7NotMdy0WgGcYd9b6vJOOtxnQQATjLFD6oTiXXTU%2BNAHHcIZ8QcyDsoSTFaEiypvZRuSMaxb%2BAMoWxTaygJKe1dqRMOSmkcFylRrrKwR5AOlvE1unEcixSoVNLVCo2UyjG%2BOtd4e6WLbYhe0kU5psSBligX7RhKiGOnQDpuSiJTyDiWRKWQKVQKiau0Y/dhx82KTmj06JMqhYtyjb3g2CmNkrjSm0PKQdrakSgHN%2Bk6JsriWLaGlPT5nw4kvBIMI6mkddOIIJm0HMcFpO2gcaWNVmilHb/qZcrF1rjm6G5M4cyRkRHLr1BqPkJK5YLS2CMJFIpb1ZnHeEB9loD0uPT%2BSeFeBMkLE/rUS2UKTnnrlNFI4vdi2r7zywCj1aha7nrxstGmuPkp%2BNFsNWqCf88N/ufxcGXSB1zfFTP2m8ixzKIxT3rz4/zguP5v9rHDdfNq5f0w%2BqFjr/zzUf5v390fw7%2BM3o8dmX9cbsZf2%2B3d/oruv%2BT2V3T/Jbf/D8RayDFls/w5AAAAAElFTkSuQmCC]()
Am 11. Juni 2012 finden nunmehr zum 43.-mal die vierteljährlichen Berliner Steuergespräche statt. Zu dem Thema Angleichung der Unternehmensbesteuerung zwischen Deutschland und Frankreich - neuer Anstoß für eine Harmonisierung in Europa%3F werden auf dem Podium
Prof. Dr. Holger Kahle (Universität Hohenheim)
MDg Martin Kreienbaum (BMF, Berlin)
Prof. Dr. Norbert Herzig (Universität zu Köln)
Laurence Simon-Michel (Französische Botschaft in Deutschland, Berlin) und
Heinz Zourek (Europäische Kommission, Brüssel) Stellung nehmen.
Die Podiumsleitung übernimmt Vorsitzender Richter am BFH Michael Wendt.
Bitte entnehmen Sie weitere Informationen dem Programm oder besuchen Sie die Internetseite www.berlinersteuergespraeche.de.