请教下什么是波登效应
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sCemvx0fUIiPk+j+/c4dBVl+zHfO1uhEN7sKPep10skLRyEt6NtdE+0S8tuZ57sXZ3B9os+SZSzFePYKgVL5bfFLfNMq+fwO7ufXHppOd1K35cVWi6+JKPJc/9GPW+2MUQz/Rr8YfaZyIiIsqCb31L/StbYpdkQ27xmptj75H/zd9oI4noUpajyBaliIiIiIgos2QQ/vnPq3fBu7X2dgoK1DviGzYAhw8Dd9yhjn/zTfXuOhFd8i61G5BERERERGOTbKxt5Ur1886d6l+dbJX9619XP2/ZwoCcaAJhUE5ERERENFq++EX17+OPA//6r+rnwkKgtla9g/61rwE+nzqeiCYEBuVERERERKNFdo/2zDPq51Ao9ld/j3z9enUcEU0YfKeciIiIiGg0yW7Q5Lvk06YBp05pIwW+R040IfFOORERERHRaJL9jsvu0cwBOd8jJ5qwGJQTEREREY022eK67i//Eli8WPsPEU00fHydiIiIiCgbcnLUv++9B0yfrn4mogmHd8qJiIiIiEab7AJNuvVWBuREExzvlBMRERERjbZPPlHvkEvyHXMimrAYlBMRERERERFlCR9fJyIiIiIiIsoSBuVEREREREREWcKgnIiIiIiIiChLGJQTERERERERZQmDciIiIiIiIqIsYVBORERERERElCUMyomIiIiIiIiyhEE5ERERERERUZYwKCciIiIiIiLKEgblRERERERERFnCoJyIiIiIiIgoSxiUZ8lgTxPKcnKQk/JQjNr20+KHx9BU5kWOdw3azw1qcxsNgzjXvgZe23VTB29lA3a296Bf+8W4kLX0TJ/ByCFsqS2L5UVZE3rEpjiNz6j+Hry2cQs6xlha6vubt7Yd57RxE924TpMxWs7GpljdndG8dpMnl0C9S+nyKXqalohjlHaOk8y5dtR6xbFsDJWbUa9H9TTIWYKmnk+1kdKg2AX3YmPTgbSvR8a3MSFf3dRZo1S/XVJc7HOacXW+MI6PLwzKKW0izTVYvKAE9zccGl+B+XgmKp/Nyxdh+YZWbQTguX0GpsFhfCb3eFkRVpSgtL5bHCaJMoTlbOxhnhBl1WDPZlQU3If67vPaGCIabxiUZ0lufhX2KgoU8zDQhUCpR0RPdWg7O2D9Tglh/fyp2q+zyYPSQBcGLOsmh/MIh5rhLwE6ahqw3XIFlzKmP4zuIxGgpBGhPrXMhNfPxxSn8drPiPQ6iOWCRl3uLFTtDUMJr8X8KTwNISIaPVcgv2q7OC8cK3EF6Xg0pDSZDE/Rw3j8ieUibN+PbftP8I7JKBg8dQKHReyNydfg6qtiu7PTeCIiIiIiGlt4tj6unUPPaxtRGX2/SL6PU4mGlk5E7KLhwQg6Wxpi0+Z4Ma/2RbzSGUlj8JyLvOkzMRsRHOkO2zzCLta3fRsaKmdr6yCGebVoeiV+nU+jvbZYfG/3vovd+0P69EvQdOz/4dDGSu3d9y+iofNMdArgAiKdLaZlz0Zlw1709DttvXw/qwM7G/R5yaEMtU0/Q2fkgjaNxvw+1MljaG+qxTz9N8nyxEkqeaW9MzOpoBrRB9Rbq1EwSZ8+J3G85d2a+LQQg20+6GzSwrJdWp5MuhXVrREgsg4LrpkUt8x4ej56Udb0a5w8tEnbXrGt5tcf3Jbb+Onler5m186B2zKmSyzDsi2FFtv1cZPOctqfocncBoBTebNlXeczlvYEZJptTZhP4jti7uehG4x0oiWVfSUZmXevvIjaeV5tHmKwpNcQ5UzfD8uacOzkAWzU033eRnQa+7m7si+36xXz/uxY/tzm32iWDStrWxOyHmyJm0+y8i9Y3v+8mDxPnGj1V2w68zJfw8medsv2Ou9jQn8P2nea64j4bdLnnea6xqYusE9PKZPlQ656quU0uZT342Ee8+Ln763ciNd60vSGakI5GCINEqYXg5tzKMdji5TefTY59VimH/MjGxbgGrE82303zrDKjWw7wpKHTvum3TnUEPtyGgxdv8WkXN6HMmQdZJJyOTWfo7wt6pom07FxpPVMknfKXZVzKdW6KpXzdLd5Er9smS7JzuvHAYXGjoEuJVDqUeCpU9rODmgj4xjT+JR163yKR2ShzMbY4FFK6lqVsPnnfUeUgK8wbjp9KFR8gSNKnzapswHlbFudWJ5HKQ10if/ZSTLNQK/SVldqs3x18Pg2K119+i8+UNr8RWJ8keJv+0Abp9OXIX7jb1PORsfp05coPl+Jab6LlUD3J+L780pvcIVNWsnlrlJWlcSn+Xkl3PakUmIzfXTwVCmBLnXJUWfbFL9Hjl+k+Jbap3NsXYeQal7p5cB2OpvB2L6zSlegyjYt5GDNB2lA6Qs1OqaFpyqo9A7E8sTyfbJybCorJb6lpvmbyo7bcjtwQglW2U0vpvWviC4jscykWsakj5RQ/cK4eceWURU8oa53lJt0HqK8lTQqIUue2DGts16m4+cTV24HugNKqZze2Eb385C/6evarPhk+Y+f1nZ6B0nrB1FG6g+KvB6inOn7YclSxWde99KA0h1NPndlfyDcqtTZpUF0WKjUhz7SpnSbf2O9bDiVf41R38l0/33yPHGScKwzLXOpT1lqW55s9tW+g0q9Ux55VijB3vNiIn3e6axrkh/PYsuWMlk+xKqkXE6TcbkfD+OYN9AbVKrs5u9ZqvhXybS0q4vjWMpeqmmQmH/JpxfrHj2uaRNLro4t6dhnk9DTwDi/0Y9l1uXY7rsmbsqNcazwPamss91PSpW6tl51X4oaIg3ij5cJ+TpEHWThtn6T0nTcklKqg1Tuyqmer4XKUt8i+/rAsh+4KXefKN2BxWJ83D7nqpxLbuqqoc7T3eaJ2/P68YFB+VjiJiiXhU8E5vWt3dpObN4h9UIu6YGE2Knqf650GzuImD4UVOqjFWwqB+7YiY19UC7n16z4ozuCtSKy7DxinRsPhrXfm35jnHhLbgMm00HJMn9V7GSgVPEHu2LpdfD5WAVgSvPY9CLNGvcbFzgGwgeVzX7tRMxcwRkHSTkfc56cVbqDdTZ54sR9XukHy1jgobIfHwuwPb5GpbU7VsENhENKsF5e5DHng2AccMzrJObTHdTyzXRwTaX8GmL5GJ/OKrdpYSpjJXVKUN+2gbBysDF28SqxzKRaxmJp55jHpiDAVTob6RZXdvu6lGC0vCW7EKYzp2dcGvR1K63RZYrxpvKQLChPdR5G+bCkiSDSPRSsV/evFE5CYyd9zysHw3rdYS5npv3HqZyZ9kPrfCS3ZV8/aYkvm6b81tPBVf5lv2xYlmubr3bl38QuMHK17wsJ0ydbR31bzesoxS6SOU2feNEwHXWNKX3iylnsGGHKl0yWDzflNBm3+7HbY55xsi/W3R800nggvF9pNIK8YQblpkDCkh9y3Tf7tXUx518s2LGmmfl8xHy8dnlsScs+m4SR9tZzisT6PBl35cY4n5DzN5dL88Upczkz8ikuDcx5Yjt9Yn0w9PYkqzsye9xKvQ4S44ZdTuV4c91kPi4Ot56xC8rdnkO5rauSn6e7zRO35/XjBYPysSSVExt9GrGTWu/MSTaBhlbZOVVsqVfk1orPcbDb2Yx1tgaUOmPnMrbbbcAU29kTtyN28ElMr1ilElu2Pr25MjExKtbENLZf32TbEmcYeWUcLONOvOzHa+viVL4Syp8prePvHJi+M5aRSvk1mH5vN73btDCWHX9BSDIdOI35DbeMJdvv9IOey3ROOCEZDnN62qSBUW5jJ3KJ5cntPPTpncq23YHfjl16J+FUzlLZD1PNk6TlI46r/BsPZWOI/LBbJ6c8cZIwvXkdbeZht0xjnM026d9Ft+l3Kc3bqewl7id62bAGRSqbtLNbd0cZLKeO9HV2sR8b6ZtkXzN9Z6RhwnFEMC78prANNmlpHOtsg6hYoJGQH3HHTJVNehppnuKxxVV+D4OR9tbyl1hOk3FXbow0TravGdurlyeHiw926eM4j1S2x1x3jOZxSzDWe6g66BP35dTII7s0sEkfu3R1ZLONbsu5vn5Oy3Osq5JtT6p5ov8/1fP68YPvlI9bt+LuwhviGgXIw/SCm7XP0iDOhV7HVvmqn/aekfHOhzYY7yEdPoFT6XgNI/IGDh94B++b5jV4/F+wTb5vWFqOB+64Vhsbk3vj/8DDy4rEb1uxN/ShNnY4PJhd4BWpYNaP3u53xF+79MpF3mc/hzmiZjMMnsD+bfvFh7lY9sBtcfMScv8Y9zx8v1hSJ7bufcv6zpanFGXF12n/cWsU8urcW9i7tVPMQHvvM34Zxnuhx3HilHx/50OE9rYiItP17j+Bx5J4uZgyfy3C8sLe3irkj6QmmT0T0/PMMxhGWuitzc++E4WeydG5xEzBZ++8TWzFCOhpZ1uOpmL++hAUJYy9VbOQ6zad87womC3WTk4/66to2NmCFod3R1PhWVaOe26MSwOj3KbWCGNq89DLRyc2LLg+cTtzrkRB9Q7xwzAOnzidZJl6WxRqfs+qbMDOlhbX78PG3IyC6XF7ruuyr9elctvmobLhJ2hp+SfYvtfmJv8ugbKRaZ5l96B4yBbZY3WE7T4/ZT7Wh+VNh+2oyr9CGymko64x9ndt3tG2EES+iDLb0lSHBxesE/uESSbLh5ty6mgE+3FKx7xB9PcexxHb44iQdzPunOPV/uPWpzi+/+cifzwoXfYF3GHJW2kybrynHMtk8m99HSHZfoFeNrTjVvS9apl3LTvRVPswFmyQ9byJ22NLmvfZzBhmubFLA317Dfq5gXY8jL73+0/q/tHyImof/Ao2WHaQ9Bnd45abOgjuy6mhCMvKbhu6h5SRlju35dx1XaWzO093mycuz+vHkfiSQeOFZyZmTIvfcXR6wb2AUyeOW08QnBw5jt6UGkdw6hJNDH3daK2/E6+tWoyljXoDOvoBWfzSsZ/s+IsJw+XF7TOmWgv14GmcOBx2Tq/4A4peMTmmbyyASK9M5JWV0SL7kN5Bd6/IPT3t7NI1jRLLhfu00LfNvoyNPM+MtEu636lcp3NuPpY8uw4+WQwjzahZXIGKRcXwTlIbxdnZnqyRlXh2Bzwzp0YYzVKch1E+hjL0MnPzv4RnA1XRg36kuQaLKyqwqNiLSdGGW7ah3U1jUDZ55DpPZJcxS76HgK9QfD6K5pqHUVGxEMXey9WGb3Z2xBqTcZF/479sjBWxOsL5uJIoHXWNytTI6iQviheJfBFltqJ6Azq0KYwgPpPlw005dZLG/diensZOx5GRHP/1k/Mkx6iEoFEwNVY2yVuMRTLvKhajeoO8/CLFAjI9T1I+tqR1n82U4ZWbpPuaJfiSjbzt1Rrguhze4oXq/lHxdWzo0Ap4QrA2UqN93HJTBw2znLoxwnLntpy7r6t0Sc7ThxSXh6me148jSYsRXSqSBNL6kI7+YvPyce/q/42X/F6XfZXrFdZ4ELvIkBmjkFelAXQP2MzXGMZ6n/imYSz3c5xyOosD3qxKbOkNI7RrBwL+UvX3QjRAXVCC+82tRI85ixHo/sRm+2LD0H2hT8GsqgB6wyHsCr4Af4l+QJUnjF/GgoKllhZah81N2c8rRNWWToRDexAM+FGijtVOeOah4P5ntVbdh5F/E6ZsjBdu6poLONmyBiWlq9AsT0pL/AgEgwjKoa0LvW11Ym5mmSwfQsrldCjp2I/HIP1Cu27wXbQ8WoHSmmZxiu8R2feCmnfBXWjrPo42f5E24XCNk302beUm0eDJXXi05D7UNB8V/yuFP7BDS+N9IkBrhX9MxEtjrLzHl1PXslTu0no+eYnWQS4wKL+kTca0GTPFYScbd0D0q2OiotAfTU3XI/Ju5E7FjNu9YuEpXpU1HgFK91XcoWQ+r3KnzcDt8mCY6p12Pe2GfIwr3dynhb5tmSpjRtqlUC5cp7Mu14OiB7+EqvV7xcHnvOlkKeLiItdQaTbU3QQpxXkY5SP+Svjw5XqK8GD5I1i/LwxlwHxysQc1a1rQM8y8HXaeiLLoKfoLlFetxz5xQjBgvmjQUY8123ti+0UK+Tf+y8ZYodcRI93nh1HvntuP76/chIhnBYK956HsW4+q8nKUy2F+Pq7WJkuQyfLhppzGy8B+bKWncSaOI/pd9lTnPYhzHT/Cyqaj8FQF0SvqmH3rH1HzrvxBzM+/RpsuRs8T1+UsLftspo2g3Dg6jY7vr0VTRAT9wRMYUPZifdWXtDQuQf7Vk7Tp0m20j1tu6iC35XQEhlnu3Jbz4ddVNtzmiT79qJ+nZx6D8kuaKSDe2oLXT8YX3kH0d26M9lGZSp+WKRn8Hc6cPi8+xN7rzJ3553ioVOy9rS149c3Eu12DJ3+Jl+W7Kcb7ackqsHP4zRtvieolVfq89mPrq2/FVdhi+9/8Z2yV773ocmdg7kNzxQe76YXB9/D6y7vF8lN8zydlo5BXxgWH3Xj59fcSDwz9h9Ag+8E0+g6+DsVlpeoJ64H/SHw3ydJf8QgrZYthpIW+bbZl7AzefLUl+l5ojMsyNuU2lMl2D9CFA0ffj5tenOiZ+3V2nc52tJOl5V/FMrnvuBA59Gv8Jv4gaZTbuXho7owhK/7U5qGnYSe2vvxLnEzYlDPobPgi7PuCT4F2crG8+iHErvkPU1ryRK6SvGiwDNXLZB2RjEP+jYuykexCqtj3fvNrHBrJDZ20yMWU4nui72DiyBs4mvAurLmP32Rlz31dYzy2afvupf5u5FAyWT7clFMpw/uxkcYRtG79Z7wZX/7638KrW2U7LsNxBWbOvU/UDw7zlk81vN4Sfe9XbavgovbIsQjQ7N5v19+TNXN9bLEz/H12NLkrNw6MR5Ht3vc1vYedAaN73HJTB/W7LKfpCs1clDu35TxNdZXKbZ7o06d4Xj+eKDR2JLRWaCPpNHqLhOZWL2MtHqLEr2wO6S2jm7v/sG8V3UpvHdGhRU3JqfsJc1cLltbZzetgbu3c3JqmqW9CS9cRdq1UOrTcaLSCWar4Nx/Uuv8wL1suJ5aew+4SzTZPhlg3C/d5ZbTomVLr66Z0taSFedviWp03WsY1d8lhTQsjH/SyadsqcTyb1kMt3KaFadvM0zuWGbdlzNyip7nLDvP66HnsLp2N8mbZTums0t3aqHbvMWQrouZlivU2d7li1z2LkNhar/t5iB9o+5bYHn+zErLr5mXIrmX0+iFuHpKpThmynCXdD93lSazFXuu0cj593T/XuslS89td/o2PshHLV7HfG33nOteZ7vZ9IeE4FltH2/rANm8duiMyl73o9LG+1G3n7bauMdLG2jezuU6MDlrdm8ny4aacJuV2P066r9kd8/Rx1vlb08zFepqXa6RBXNm21OV6/pnSt+RJpc2oa+LKtljP2HmO+TemPHQ4VqRnn03CyCvrvuZ0LmDLZblJPFaYJOz7pryua43NOy69LOufkK9D1AcW5n0mrgxk9LglpVoHifm4KqeS3X6kS0wfd+XOroV5d+XcMn0qdVXS7RHc5okxvXnZSY5R4wSD8rEk4UTFRtJp7IJywQisZAGOH8wnXclYK76kQ0In/4K5P0ubwePbrHSZK0CndRbzfmHHurgDxBA7u9xRjT7czYPY+df9QKlPSE+n6bUhfvsSDihmQ61bHJd55S4ol2IHEbshIR9Evvd1bVYrdJvprSc2+rZq3yWtEBMPKgncllvHMrZQWRd4OvGkwlUZk84qXYEqh30g7gTEVTonn1YedMwn//ZM6elbpayy2y5LXsXKiN1BNtV5yN8YFyvsBru6wE7SvBZDKuUs6X4oucmTIbbLkt9u82/slw3n5Yr97oVmmzrTzb4vpCUoF/qOKAGjn+v4QU+bdNc1povMyQaj7s1k+XBTTpNxuR8P45g3EG5V6hzKXqB+UcL0thyW6zjv6BCXf6bgyHmIO4dydWxxmd/6NqV6QctpemO8OjiW9Sh35cZdUC6TSwsQE+ZrHtIflI/6cUtKqQ5SuSqnSc8d7dLHTbmzC8oFt+dQruqqZNsjuc0Tt+f14wOD8rEkU0G5JK826R3wa4XX46tXdrSZOulPKlYJWHcA0yDvIO7YY73TZXFW6W77qXYVVvtNiV8JOK2D+c67GPQrkYkHiKF2dkns8N1tSsC4Ki8qQHkX/PdO6Smn36fsMC1fVmr+QJtxt9jgcKKgSmXd4rjIK/dBuSSvJgat+RDNu32J26YZCIeUYAppMRDerzQa8012kpHiQdd1uZVlLGC6Uqo+mfF7p5OKlMuYzibtHMuwm3S22TfkwcUfUNr0q+9JWdPzI0s+OORVwja6n4cusXyI/av+pymuu0bkRdsOa167KmdJ90OdmzyxqwPEYJvfbvMvm2XDfHcyWb6K5ep3WPT1k0+IOByDUt/3hXQF5VJCHRGfNpmoa+LSRg6yXATF8a/7l1qAb06DTJYPN+U0uZT34+Ee8+Q+HjDddYveMRRpYxcg2Em23IT6I0n6xtX76rQvKMFdB5Xug1pgkHDslHmY6rHFRX7r2zTUPqNznF6UmYPPx7bf9thvlnq5cT4eCjZBuTpv/Y67Pm9Z1+xQdoX+XTkYDeRM56kJ+ZriPhs13PpN/DIdxy1pyDrIJOVy6jYol1Itdw5BeZSbci6lWleldi7sLk9kOXNzXj/25ch/xMYQEdG4Jd9r/y5mLVgH+NtwbFgtlKZjHkRERETkFht6IyIiIiIiIsoSBuVEREREREREWcKgnIiIiIiIiChL+E45ERERERERUZbwTjkRERERERFRljAoJyIiIiIiIsoSBuVEREREREREWcKgnIiIiIiIiChLGJRn22AEnVtqMS8nBznRYQmaej7VvhxLTqO9tlisXzFq208nGZcu59Dz2oto6kj3fCc6pisRERER0VjCoDyrPkXP5kdRvHwDOrQx8MzEjGmTtf9MVCJdmr6GgtIfoXtQG0VpwHQlIiIiIhprGJRnVT96u98RfxeiPvQRZO90Sngt5k9hthAREREREU0EjP6yafA0ThwOiw9X4bqrr1DHERERERER0YTBoDwr5GPES5Az6VZUt0bE/3eguuDKuHezB9Hf04GdDZXwGu+bl6G26WfojFzQptGca0etV3xf1oRjJw9gY+Vsdfp5G9HZP9RzyufQ074NDfpvosNsVDa0JC5npOT786+8iNp53tiy5tWi6ZVORPTVjG7LlSio3iH+04kNC64X02npktJ2XkCks8W6PfHLMBmMdOKVJvM7/V7Mq30Rr3RGRA5YuZnWydDz0MqG43v6gyIZ1ogy4UVZ0zH1NyNNV52cT0sDKmUaJ90+c1sC/ynK6d5Yensr0fBaD/qj08n31zfG5ifXqV3/LiYd6UpERERENG4plAWfKN2BxYpMfutQpPjbPhDfn1fCbU8qJQnfa4OnSgl0nVVnJZ1tU/weMb5kqeIr8cSmKw0o3QPaNHYGepW2ulLrvM2DZ4US7D2vTfyB0uYvEuP1dXQa5yDpsjxKSf1BpU9Op2+L5Xtt/kNu51mlK1CleCy/jQ0e32alqy+WIAPhVqXOPB/LsFCpD32kTeluWiepzmOgO6CUinEef5vYonh6mi9WAt2fpCddpb4jSsBXGPe9PhQqvsARdT5R+jqI8eueVHwJ8y1UqoKHlX+3zYv0pysRERER0XjGoDybBrqUQKkMSLQASzPQG1SqooGOCHoa9ythLY4cCB9UNvu1AKykUQnpAaYp4PL4nlcOhvVAOpkB8bO6aNAU/5vYcjxKaaBLTCmNLCg3Ak3LsgaUvu6g4o8GZeY00C9axM036XaKeYUaoxcyPL5GpbU7Fs4OhENKsN4nttUUpBrLsKaxDOy7g3XqBREj2HczrRMX8xg4oQSrZIBsLRdRehpo06YlXZWPlFD9QnXd6n+udBsXLs4r4VBQqY8G6+YAWc93mRfm7Ym7mOTxKY0Hw2r5GQgrBxtlHoh1NS42pCNdiYiIiIjGNz6+PuZ8iuN7f4qmiAcl9QFseuxueLRcyvXMQeW6FyACNqDjZWw/9KH6haEIyyofwhxPKq23f4jQ3lZEsBhPP15t+U2upxj/s6wIHvHtke5wwuPG7g2iv/c4jsiP027FLGNZucjLL8f6fWEoynZU5af6Xr3ddn6IQ9tfRoenDi899yjuzZ+ijZfbU4TyVXV4WkSvHY27cOicfChab2Tvckz7XIGRxsAU5JevxT55wWpvFfKj491M68TFPHL/GPc8fL9I//3Ytv+E6RHuQZwLvY6tomyUPvTnmJmbpnQ99wa2N+6Bx/8snltdhvw8feUmw1NUjlWPP4ZS7EHj9jdwTvtGF/2NUUbF9CUPYVmpCL1RiKrn/w6PzvGo78jkejCnuhLLxFeRwydwKrpR6UhXIiIiIqLxjae7Y83gCezftl98mItlD9yGPHVsjBGwdWLr3rfigqSbUTA94RcOpmL++lAsaIu+l9yClhYxNNXhwQXrREieLiJInD4Ts8WnyIYFmFXZgJ1iOcN/Z9hmO8+9hb1bO8UC1mHBNZOgvptsGvT39yPHceKUfFc+D9MLbhZ/5fvV81DZ8BOx7f/k8B69m2mduJlHLqbMWYRVJUDrtn/BcSORtAspnnJ8o+xmMVU60lUP9NV5XBOfbmKYVFCNVjFlLJjWFWFZ2W0ihLZzK+4uvMG+gjlyHL3RNgDSka5EREREROMbg/Kxpj+M7iMiQnLsrzwWiCVw3ce5qSGuSV4UL6pARYUYqmP9picGYsOTm/8lPBuogryHGmmuwWKxnEXFXkyKNiq3De098fdgk7DZzsFTJ3A4pasI76C7V977vwL5S76HgK9QfD6K5pqHxbYvRLH3crWxsp0d6DEaj3MzrROX88i7DQ8smyui8p9j//FP1XHahQfPsnLcc6O6/SNP1ws4deJ4ahdgjGA6XdKRrkRERERE4xuD8nHH9MjyiFzAyZY1KCldhWYZkZX4EQgGEZRDWxd62+qigV76TMGsqgB6wyHsCr4Af4k+dxmMfRkLCpaiofOMNm4ESgPoHoi2leAwhLB+/lR12rxCVG3pRDi0B8GAHyXqWBndombxPBTc/2ysVXc30zpxNY8rMHPufSjFfmx99S30G3e04+9OpytdPSLpujBgm2bakIk+9NORrkRERERE4xiD8rEmz4uC2SKwMh6zzpBz+/H9lZsQ8axAsPc8lH3rUVVejnI5zM/H1dpk6Sbf736w/BH1feeBMEK7diDgLxXf7EHNmhb0DDP+yp02A7fLeNT13Vz53vRfoLxqffQd5gFzcNtRjzXbe0yPgruZ1knq88jNfwC1fq/2Hvxp7dH1UpQVX6dNETP8dJ2MaTNmipA8Xe0HDEc60pWIiIiIaHxiUD7W5M7A3Ifmig/6HdI4g+/h9Zd3ixAq2fu8QzMe9559JwoTGobTG4HLsFwPih78EpZXPwQZPo6IcTFjN15+/b3EIK7/EBpkP97eNWiPNvRmTw1ul6FaPjo+BDfTOkk+j+tQXFYKT6QVe1v3ao+u34Pioe5Wu0pX03vpW1vw+sn4C0GD6O/cGO1D3FvbntDQWyakI12JiIiIiMYLBuVjzhWYWfZlVHki6KipxoqNBxDRYsjByCFsqfs6KpqOAiUPY8mcxDumqTLuLLduw+aOk0YQG11G7cNYsKFTG5MO8lH5lfDmeDGvdqu1Ia/+HrS9+ovo4/ie22dgmqVEhnH4xOnU7pLm5uNLtcvhwVE0VXwddVsOWdPtqSdQ0yGSbdUizJFB7eC7aKmejZycMtSapo0GoT2/wKu/6BKfvbh9xlTkuplW/SLRsOahN/gWxobFPmxIeHQ9Pemq3pEvElH5JlR85QlsMRqKu4BI58t4anU9OrAQq5bcOeyLQLbSka5EREREROOdQtnj0E95Qn/P8YOnSgl0xfrhNvqu9tQpbWdT7dT5vNIbXBHtN9p2Gfpg9BM9sn7Klb6DSn2032ybZcih5EmlzdTPtt6Huvq9Nv8ht1Pvb1v/nXXw+DYrXUYf3LF+ze2mFaGsUlLXqvWd7WZaJ8Odh96Xt5jGbrvTka5S0vkUKr7AEa1/dylJvjuWaSEh/9KRrkRERERE4xtvQI1Jk+GZ/wR2d+/DjnqfqcG1UvgDbejueRFVs0Z6z3Iybixfi47WRvhiC9AafNuDUPcvIYI0a+vfI5E3B6t3d6BtR711efo27X4C8039bE8p+TZ2Nerbnuod82tRtLoF4VAQ9dEWvTUeH+p37EPHpmWYZfTBnYu8okdt0liQadDWgd1r79X6znYzrZPhzkN/51tsht2j6+lKVzmftk6Egtb5eHz12NEWxKaqwsTu+UYsHelKRERERDS+5cjIXPtMRGPOabTX3ocFGwB/289jLccTEREREdElgfegiMasC4i0b8JT8v3+0m+huoQBORERERHRpYZBOdFYM3gMTWVe5ORcDu+CJ6ONrNWvLUc+91YiIiIioksOT/OJxprcqZhxu1f9LN+Hb23EN4uuVf9PRERERESXFL5TTkRERERERJQlvFNORERERERElCUMyomIiIiIiIiyhEE5ERERERERUZYwKCciIiIiIiLKEgblRERERERERFnCoJyIiIiIiIgoSxiUExEREREREWUJg3IiIiIiIiKiLGFQTkRERERERJQlDMqJiIiIiIiIsoRBOREREREREVFWAP8fxvdXggnZlwwAAAAASUVORK5CYII=看公司规范,发现有如上描述:波登效应减小管道应力,但会增加末端载荷。所有应力系统中都应该考虑(瞎翻的,不是很准确,囧~)。
请教下什么是波登效应?
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