Analyzing the Weyl–Heisenberg Frame Identity

Analyzing the Weyl-heisenberg Frame Identity

In 1990, Daubechies proved a fundamental identity for WeylHeisenberg systems which is now called the Weyl-Heisenberg Frame Identity. WH-Frame Identity: If g ∈ W (L∞, L), then for all continuous, compactly supported functions f we have: ∑ m,n | < f, EmbTnag > | = 1 b ∑

the crisis of identity in jhumpa lahiris fiction: interpreter of maladies and the namesake

شکل گیری هویت(identity) مقوله مهمی در ادبیات پراکنده مردم(diasporan literature) می باشد. آثار جومپا لاهیری(jhumpa lahiri) ، نویسنده هندی آمریکایی، در سالهای اخیر تحسین منتقدین را به خود معطوف کرده است. وی در این آثار زندگی مهاجران و تلاش آنان برای پیدا کردن جایگاهشان در یک فرهنگ بیگانه را به تصویر کشیده است. این تجربه همواره با احساساتی نظیر دلتنگی برای گذشته، بیگانگی و دوری همراه است. با این ح...

From Analyzing to Reflecting: Computational Supports for Frame Reflection

While numerous computational techniques have been developed for analyzing patterns of social media use, less work has explored incorporating such techniques into tools designed for social media users. Here, we argue for the value of such tools, particularly in the context of political discussion. Rather than being used for abstract analysis, these tools can draw attention to computationally ide...

Analyzing Synta ti Frame Distributions of Verb Classes

Decompositions of frames and a new frame identity

If B < ∞ we call F = {fi}i∈I a Bessel sequence with Bessel bound B. If 0 < A ≤ B < ∞, then {fi}i∈I is a frame for K. If K 6= H we call {fi}i∈I a frame sequence in H. The largest A and the smallest B satisfying the above inequalities are called the optimal lower and upper frame bound and will be denoted A(F) and B(F) respectively. If A = B = λ we call this a λ-tight frame and if λ = 1 it is call...