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qz2PNMdB0+if9w3NSYtjhqlsfsS2L+VVE6cZB/09Me962OzT/O6fd+18RL5/y3Jz0DAACQj+GXivSgv/6fke0DNk4+PT56b0xfEhGpVGrQlRsysD3dn2ranq5fHwc3xaHd0bovOg9F16FIp1Ml5emiihg3JcbXRNXcmHJGVJ8bE047wc47D8X3PhB7njmJKx2V8Z5o+7aPPH36uSs8AwAAkI/hN6IKS+LCT8Xln4nyKbkxsN1PxwM3RuOWXH/jt9dct+CTP/QAAACA8BspJePjvBviwlti6pljd1QNdfHY52PDPZHuz/m3vWziwT/cMK26xgMAAADCb4TPJRVnXBMrPh1zrxhbQ2rcEk9+IdZ/NwO/FjM2rLvoG+e9/xPufgAAEH6jZ+pZsfzGOHd1VFSP5mn0dcWWn8bab8XWh2OwP/nLUbunvHv2px9x6wMAgPAbC6dWGPOvioXvj9NXxpQzRu64DXXx6lOx47HY8tDJ/RxoTiibWH/9uhkzZ7v1AQAgfxSN3VNL98W2R2LbIxERVQtiwe/G3MtjzmUxPtN/mdbdEq//JvY+H7ufiV2/irb6BL/fL573f5epPgAAyDNj+BO/oVTWRs3ymLY4ppwekxdG1bwYPyNSBcP6b3s74vCeaH41mrbFwbpo3BoHNkbz9iR9k/Nt7Jj5+/NvustNDwAAwm8MLTQ33O0FxVE5M8bXxLipqfKJ6VRxlFa+kXm9XdF1KNXZlG47GK37oqMht6/0nRy0fPKhm+omTZ7ipgcAgHwzyFc9By2HTG3Pys77e6J5ZzTvjIj04P84sndFI3ql7+CgL1/01SWqDwAA8lKBEeSDDUtuX3LF75sDAAAIP5Jpy5wbz772M+YAAADCj2Sqr7xw7se+Yg4AACD8SKaOsprC1feXlJYaBQAACD+SqLh87wcemFZ9mkkAAIDwI5FS6y/+zulLLjQIAABgkPBLDbH8QUa2Z3XnDvrmxk2Lblt65XXubwAAYPDwy6vV7RJ50K2T37vw9253cwMAAEOGHzmtftKKWTfdW1RUZBQAAIDwS6DdE99VfsND5eXjjAIAABB+CbSh6oPVn/rlxElVRgEAABzLFwKTU30Lb7m3pKTEKAAAgOP4xE/1AQAA+Rd+VlbIrYPunviu02++R/UBAABDGeSrnlZWyKGD1k9aMfGGn5SWlrqVAQCAkwg/csWeaSun/OG948ZVGAUAAPA2/I1fjkptPOPWGX/8Y9UHAACcUFFEKob4KzLGqOKydSu+c95Vv2cSAADAcBS8fMV9UeJTo5zRUTpjy9WPqT4AAGD4Uul0evvGdTMe/HB5207jGOP2TTi/4GP3V9fMMgoAAODkwi8imhobWr7/sdqDPzeRMauu9uNzV3+1tKzMKAAAgJPyxo+7VE2eMvOWn26eeX1YUm9MHvSVsz+/6I++rfoAAIBT8MYnfkek0+l19/3t0g1/Ef09RjNWlE1cf/4/Ln3PapMAAAAyEH5H7N6+ufgnf1Td9LTpjLrtMz4y6bp/mjJ1ulEAAACZDL+I6OvrW3fvF5bV/XX0+ehvlJSOX3/el5e+70aTAAAAshJ+R2zfsLbq4RsmHX7ZmEbY7slXFK765szZ84wCAADIbvhFRHd398b7bj936//x0d8IKZ2w9uw7ll99cyqVMgwAAGAkwu+InZtfKvv3T1Y3P2teWbVt+jUTPvyPlukDAABGIfwiIp1Or3/s3trn/3dVe52pZVz9pBUtl9+xcPnlRgEAAIxa+B3R3dVV94Nbz975lQG7iHQ6Bvle4qDbT+ofZ2r7mD5oQdG6xX+19No/891OAABgTITfEZt/s2biY/+9+vBzxvcO7Zn+3r73fHHuwsVGAQAAjK3wiyNLvT96z+znP1vVsdUQT8G+yguaLr1j8UVXGgUAADBGw++Ivr6+DY/cOX/jl8Yd3myUw9Qw5eLXz71tyW+vMgoAACAHwu9NG3710Lhn/2ZOyzMG+jb2VH+g812fWbj0YqMAAAByL/yO2PTCkxW//rtZ9T+NSJvsUQXFdTUfLbns1nlnnmsYAABAboffEbu2bWp8/B+W7v9udLXm+XA7SqbVzfnEaVd9avqMmW41AAAgOeF3RGvL4S1r7puy5Xu1jY/l3QeABUXbp1/dftZ/WXTxB0pKStxkAABAMsPvTbu3bmh99I4z990V/b2R+HX8SipemXXj9PfcOr2m1r0FAADkS/gd0XigfttTd9fuvru66dkEfgBYULxl4hUtCz+66LJrx0+odFcBAAD5GH5vamo4uOO5hyq3P7Cg+efR3Z7bwyuveqnyfb2LPnLmipXjxlW4mQAAAOE3QFdnZ90Lj/bXPVx74JGq9rocmljzpKU7p64sWfTeRcsuKSoqcg8BAADC78QOvL7ntQ1PF+x5ZtrBNTNaX4x039gaUlFpfeWF+6ZcVjD74tqzV1RNnuq+AQAAhN+p6+ho37HhhZYdz5cfWFvb/uKkts1HfhVmZEuvfF/ZmQ2TlnVNP3/ivAtmL1rqxzkBAADhly19fX2v797ZsGtD74G6gsYtFe07a/t3lrXtjt6OzBygdEJzce3BsnnNZfNi8unjahZNnbO4+jS/yQkAAAi/0dZ6+FBT44G2pv2dhw60tzSV9x1Kdx7u6Wrr7+vt7Ri4cHxBQVHpuMKikqKyir7iyt7iieMnTSmdMGX85BlVU6eXl49zEwAAAMIPAACAHFZgBAAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAADhBwAAgPADAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAACA8AMAAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAAAg/AAAABB+AAAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAEH4AAAAIPwAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAAAg/AAAAhB8AAADCDwAAAOEHAACA8AMAAED4AQAAIPwAAAAQfgAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAADhBwAAgPADAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAACA8AMAAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAAAg/AAAABB+AAAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAEH4AAAAIPwAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAACD8AAAAhB8AAADCDwAAAOEHAACA8AMAAED4AQAAIPwAAAAQfgAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAADhBwAAgPADAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAAAAwg8AAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAAAg/AAAABB+AAAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAEH4AAAAIPwAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAACD8AAAAhB8AAADCDwAAAOEHAACA8AMAAED4AQAAIPwAAAAQfgAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAACEHwAAgPADAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAAAAwg8AAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAAAg/AAAABB+AAAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAQPgBAAAIPwAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAACD8AAAAhB8AAADCDwAAAOEHAACA8AMAAED4AQAAIPwAAAAQfgAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAACEHwAAgPADAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAAAAwg8AAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAACA8AMAABB+AAAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAQPgBAAAIPwAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAACD8AAAAhB8AAADCDwAAAOEHAACA8AMAAED4AQAAIPwAAAAQfgAAAAg/AAAA4QcAAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAACEHwAAgPADAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAAAAwg8AAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAACA8AMAABB+AAAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAQPgBAAAIPwAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAACD8AAAAhJ8RAAAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAACD8AAAAEH4AAADCDwAAAOEHAACA8AMAAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAACEHwAAAMIPAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAAAAwg8AAADhBwAAIPwAAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAACA8AMAAED4AQAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAAIQfAAAAwg8AAADhBwAAgPADAABA+AEAACD8AAAAEH4AAADCDwAAAOEHAACA8AMAAED4AQAAIPwAAAAQfgAAAAg/AAAAhB8AAIDwAwAAQPgBAAAg/AAAABB+AAAACD8AAACEHwAAAMIPAABA+AEAACD8AAAAEH4AAAAIPwAAAIQfAAAAwg8AAADhBwAAgPADAAAQfgAAAAg/AAAAhB8AAADCDwAAAOEHAACA8AMAAED4AQAACD8AAACEHwAAAMIPAAAA4QcAAIDwAwAAQPgBAAAg/AAAAIQfAA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)
Atuar-atuado: cena, pajelança e uma possível rotação de perspectiva
Katia Brito
Florianópolis, v.1, n.43, p.1-19, abr. 2022
evoco a imagem narrada por Davi Kopenawa (Kopenawa; Albert, 2015) referente ao
xamanismo Yanomami, ao explicar que os sonhos dos
xapiris
deslizam pela corda
da rede para entrar nos xamãs, e que, sem as cordas, os sonhos se perderiam; é
impossível ser xamã sem sonhar longe e de forma inesgotável. Kopenawa
(Kopenawa; Albert, 2015, p. 315) compara as cordas das redes por onde passa o
xapiri às antenas por onde os sonhos descem, e conta que, por isso, os xamãs
sonham rápido e alcançam terras distantes como se vissem imagens de televisão.
Assim, é possível pensar a cinta na pajelança como um elemento que
possibilita à pajé se lançar ao infinito de fora e, ao mesmo tempo, a mantém atada
ao ínfimo de dentro, como o cabo forte que liga o astronauta a uma nave espacial
e evita que seu corpo seja atraído pelo vácuo quase absoluto do espaço
.
Atuar-atuado: cena e pajelança
Tendo em vista os pressupostos de que a prática do corpo atuado, em busca
do centro no encontro com o Outro, conjura a hierarquização dos seres e cria
aberturas nas fronteiras ontológicas, é possível colocar a prática em diálogo com
o perspectivismo ameríndio. Nesse sentido, Tania Stolze Lima observa
:
Diferentemente da tríade hierárquica cristã, totalizadora, garantia da
identidade humana e de sua precedência opositiva sobre os outros
animais, na tríade ameríndia a posição do meio pertence a todo aquele
que a ocupa, enquanto a ocupa; ela é por isso aberta. O ponto de vista
não é propriedade de x. Não creio, porém, que pudéssemos caracterizar
os regimes indígenas como igualitários. Restituamos, portanto, à frase de
Rosa o seu x, que sempre esteve lá para assinalar, ao modo de um
“índice”, a assimetria irredutível à forma-Estado do Um (à Identidade, ao
Todo). Ele serve para representar graficamente não só a especificidade
do ponto de vista contra a hierarquia como a dimensionalidade fractal do
Uma leitura mais aprofundada sobre a noção de cinta na pajelança cabocla de pena e maracá encontra-se
na dissertação
Corpo Atuado: aparições xamânicas na Amazônia Marajoara
(Brito, 2019).
A frase de Guimarães Rosa evocada por Lima está no livro do autor Ave Palavra, de 1978. A partir dela, a
autora introduz suas reflexões sobre as tríades cristã e ameríndia: “‘O macaco está para o homem como o
homem está para x’ (ROSA, 1978). Cega para a destreza dialética de Rosa, troquei, certa madrugada, x por
Espírito, sem dúvida imaginando algo provavelmente como uma escala do ser. Do macaco a Deus, passando
pelo homem, obtém-se uma ordenação hierárquica orientada de um mínimo a um máximo de espírito, por
meio da distribuição desigual de um valor. Mas quase instantaneamente não ficou menos evidente que a
leitura cristã não era a única permitida. Os Yawalapíti, por exemplo, que dizem que gente é macaco de onça,
poderiam ser tentados a trocar x por onça. Como deveríamos distinguir essas permutações, senão por seu
regime de diferenças, por sua política da diferença? A onça é indiferente à diferença entre o macaco e o
homem: somos macacos como os demais macacos. O macaco, por sua vez, é indiferente à diferença entre
a gente e a onça: somos onças como as demais onças” (Lima, 2011, p.622).