Identifiability for mixtures of centered Gaussians and sums of powers of quadratics

Abstract: We consider the inverse problem for the polynomial map that sends an ‐tuple of quadratic forms in variables to the sum of their th powers. This map captures the moment problem for mixtures of centered ‐variate Gaussians. In the first nontrivial case , we show that for any , this map is generically one‐to‐one (up to permutations of and third roots of unity) in two ranges: for and for , thus proving generic identifiability for mixtures of centered Gaussians from their (exact) moments of degree at most . Th… Show more

“…It is worth mentioning that the study of Waring‐type problems and identifiability of symmetric tensors has been implemented also in the applied fields, from chemistry, biology to algebraic statistics. Recently, in [6], the problem of identifiability for $$k$$th powers of forms was linked to the identifiability of centred Gaussian mixture models in applied statistics.…”

Waring identifiability for powers of forms via degenerations

“…It is worth mentioning that the study of Waring‐type problems and identifiability of symmetric tensors has been implemented also in the applied fields, from chemistry, biology to algebraic statistics. Recently, in [6], the problem of identifiability for $$k$$th powers of forms was linked to the identifiability of centred Gaussian mixture models in applied statistics.…”

Waring identifiability for powers of forms via degenerations

Generalized identifiability of sums of squares