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Mathlib.Analysis.BoxIntegral.Box.SubboxInduction

Induction on subboxes #

In this file we prove the following induction principle for BoxIntegral.Box, see BoxIntegral.Box.subbox_induction_on. Let p be a predicate on BoxIntegral.Box ι, let I be a box. Suppose that the following two properties hold true.

Then p I is true.

Tags #

rectangular box, induction

For a box I, the hyperplanes passing through its center split I into 2 ^ card ι boxes. BoxIntegral.Box.splitCenterBox I s is one of these boxes. See also BoxIntegral.Partition.splitCenter for the corresponding BoxIntegral.Partition.

Equations
  • One or more equations did not get rendered due to their size.
Instances For
    theorem BoxIntegral.Box.mem_splitCenterBox {ι : Type u_1} {I : BoxIntegral.Box ι} {s : Set ι} {y : ι} :
    y BoxIntegral.Box.splitCenterBox I s y I ∀ (i : ι), (I.lower i + I.upper i) / 2 < y i i s
    @[simp]
    theorem BoxIntegral.Box.exists_mem_splitCenterBox {ι : Type u_1} {I : BoxIntegral.Box ι} {x : ι} :
    (∃ (s : Set ι), x BoxIntegral.Box.splitCenterBox I s) x I
    @[simp]
    @[simp]
    theorem BoxIntegral.Box.upper_sub_lower_splitCenterBox {ι : Type u_1} (I : BoxIntegral.Box ι) (s : Set ι) (i : ι) :
    (BoxIntegral.Box.splitCenterBox I s).upper i - (BoxIntegral.Box.splitCenterBox I s).lower i = (I.upper i - I.lower i) / 2
    theorem BoxIntegral.Box.subbox_induction_on' {ι : Type u_1} {p : BoxIntegral.Box ιProp} (I : BoxIntegral.Box ι) (H_ind : JI, (∀ (s : Set ι), p (BoxIntegral.Box.splitCenterBox J s))p J) (H_nhds : zBoxIntegral.Box.Icc I, ∃ U ∈ nhdsWithin z (BoxIntegral.Box.Icc I), JI, ∀ (m : ), z BoxIntegral.Box.Icc JBoxIntegral.Box.Icc J U(∀ (i : ι), J.upper i - J.lower i = (I.upper i - I.lower i) / 2 ^ m)p J) :
    p I

    Let p be a predicate on Box ι, let I be a box. Suppose that the following two properties hold true.

    • H_ind : Consider a smaller box J ≤ I. The hyperplanes passing through the center of J split it into 2 ^ n boxes. If p holds true on each of these boxes, then it true on J.

    • H_nhds : For each z in the closed box I.Icc there exists a neighborhood U of z within I.Icc such that for every box J ≤ I such that z ∈ J.Icc ⊆ U, if J is homothetic to I with a coefficient of the form 1 / 2 ^ m, then p is true on J.

    Then p I is true. See also BoxIntegral.Box.subbox_induction_on for a version using BoxIntegral.Prepartition.splitCenter instead of BoxIntegral.Box.splitCenterBox.

    The proof still works if we assume H_ind only for subboxes J ≤ I that are homothetic to I with a coefficient of the form 2⁻ᵐ but we do not need this generalization yet.