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For any field F and positive integers m, n, d with (m, n) = (1, 1), Farb and Wolfson defined the certain affine varieties Poly^d, mₙ (F) as generalizations of spaces first studied by Arnold, Vassiliev, Segal and others. As a natural generalization of this, for each fan and r-tuple D= (d₁, , dᵣ) of positive integers, the current authors defined spaces Poly^D, ₙ (F), where r is the number of one dimensional cones in. These spaces can also be regarded as generalizations of the space Hol^*D (S², X_) of based rational curves from the Riemann sphere S² to the toric variety X_ of degree D, where X_ denotes the toric variety (over C) corresponding to the fan. In this paper, we define spaces Q^D, ₙ (F) (F= R or C) which are real analogues of Poly^D, ₙ (F) and which can be viewed as a generalizations of spaces considered by Arnold, Vassiliev and others in the context of real singularity theory. We prove that homotopy stability holds for these spaces and compute the stability dimensions explicitly.
Kozłowski et al. (Sun,) studied this question.
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