Documentation

Mathlib.Topology.Instances.EReal

Topological structure on EReal #

We endow EReal with the order topology, and prove basic properties of this topology.

Main results #

Implementation #

Most proofs are adapted from the corresponding proofs on ℝ≥0∞.

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instance EReal.instTopologicalSpace :
TopologicalSpace EReal
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instance EReal.instOrderTopology :
OrderTopology EReal
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instance EReal.instT5Space :
T5Space EReal
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instance EReal.instT2Space :
T2Space EReal
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theorem EReal.denseRange_ratCast :
DenseRange fun (r : ) => r
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instance EReal.instSecondCountableTopology :
SecondCountableTopology EReal
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Real coercion #

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theorem EReal.isEmbedding_coe :
IsEmbedding Real.toEReal
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@[deprecated EReal.isEmbedding_coe]
theorem EReal.embedding_coe :
IsEmbedding Real.toEReal

Alias of EReal.isEmbedding_coe.

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theorem EReal.isOpenEmbedding_coe :
IsOpenEmbedding Real.toEReal
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@[deprecated EReal.isOpenEmbedding_coe]
theorem EReal.openEmbedding_coe :
IsOpenEmbedding Real.toEReal

Alias of EReal.isOpenEmbedding_coe.

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theorem EReal.tendsto_coe {α : Type u_2} {f : Filter α} {m : α} {a : } :
Filter.Tendsto (fun (a : α) => (m a)) f (nhds a) Filter.Tendsto m f (nhds a)
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theorem continuous_coe_real_ereal :
Continuous Real.toEReal
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theorem EReal.continuous_coe_iff {α : Type u_1} [TopologicalSpace α] {f : α} :
(Continuous fun (a : α) => (f a)) Continuous f
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theorem EReal.nhds_coe {r : } :
nhds r = Filter.map Real.toEReal (nhds r)
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theorem EReal.nhds_coe_coe {r : } {p : } :
nhds (r, p) = Filter.map (fun (p : × ) => (p.1, p.2)) (nhds (r, p))
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theorem EReal.tendsto_toReal {a : EReal} (ha : a ) (h'a : a ) :
Filter.Tendsto EReal.toReal (nhds a) (nhds a.toReal)
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theorem EReal.continuousOn_toReal :
ContinuousOn EReal.toReal {, }
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def EReal.neBotTopHomeomorphReal :
{, } ≃ₜ

The set of finite EReal numbers is homeomorphic to .

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Instances For

    ENNReal coercion #

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    theorem EReal.isEmbedding_coe_ennreal :
    IsEmbedding ENNReal.toEReal
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    @[deprecated EReal.isEmbedding_coe_ennreal]
    theorem EReal.embedding_coe_ennreal :
    IsEmbedding ENNReal.toEReal

    Alias of EReal.isEmbedding_coe_ennreal.

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    theorem EReal.isClosedEmbedding_coe_ennreal :
    IsClosedEmbedding ENNReal.toEReal
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    @[deprecated EReal.isClosedEmbedding_coe_ennreal]
    theorem EReal.closedEmbedding_coe_ennreal :
    IsClosedEmbedding ENNReal.toEReal

    Alias of EReal.isClosedEmbedding_coe_ennreal.

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    theorem EReal.tendsto_coe_ennreal {α : Type u_2} {f : Filter α} {m : αENNReal} {a : ENNReal} :
    Filter.Tendsto (fun (a : α) => (m a)) f (nhds a) Filter.Tendsto m f (nhds a)
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    theorem continuous_coe_ennreal_ereal :
    Continuous ENNReal.toEReal
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    theorem EReal.continuous_coe_ennreal_iff {α : Type u_1} [TopologicalSpace α] {f : αENNReal} :
    (Continuous fun (a : α) => (f a)) Continuous f

    Neighborhoods of infinity #

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    theorem EReal.nhds_top :
    nhds = ⨅ (a : EReal), ⨅ (_ : a ), Filter.principal (Set.Ioi a)
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    theorem EReal.nhds_top_basis :
    (nhds ).HasBasis (fun (x : ) => True) fun (x : ) => Set.Ioi x
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    theorem EReal.nhds_top' :
    nhds = ⨅ (a : ), Filter.principal (Set.Ioi a)
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    theorem EReal.mem_nhds_top_iff {s : Set EReal} :
    s nhds ∃ (y : ), Set.Ioi y s
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    theorem EReal.tendsto_nhds_top_iff_real {α : Type u_2} {m : αEReal} {f : Filter α} :
    Filter.Tendsto m f (nhds ) ∀ (x : ), ∀ᶠ (a : α) in f, x < m a
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    theorem EReal.nhds_bot :
    nhds = ⨅ (a : EReal), ⨅ (_ : a ), Filter.principal (Set.Iio a)
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    theorem EReal.nhds_bot_basis :
    (nhds ).HasBasis (fun (x : ) => True) fun (x : ) => Set.Iio x
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    theorem EReal.nhds_bot' :
    nhds = ⨅ (a : ), Filter.principal (Set.Iio a)
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    theorem EReal.mem_nhds_bot_iff {s : Set EReal} :
    s nhds ∃ (y : ), Set.Iio y s
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    theorem EReal.tendsto_nhds_bot_iff_real {α : Type u_2} {m : αEReal} {f : Filter α} :
    Filter.Tendsto m f (nhds ) ∀ (x : ), ∀ᶠ (a : α) in f, m a < x
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    theorem EReal.nhdsWithin_top :
    nhdsWithin {} = Filter.map Real.toEReal Filter.atTop
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    theorem EReal.nhdsWithin_bot :
    nhdsWithin {} = Filter.map Real.toEReal Filter.atBot
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    theorem EReal.tendsto_toReal_atTop :
    Filter.Tendsto EReal.toReal (nhdsWithin {}) Filter.atTop
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    theorem EReal.tendsto_toReal_atBot :
    Filter.Tendsto EReal.toReal (nhdsWithin {}) Filter.atBot

    Infs and Sups #

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    theorem EReal.add_iInf_le_iInf_add {α : Type u_2} {u : αEReal} {v : αEReal} :
    (⨅ (x : α), u x) + ⨅ (x : α), v x ⨅ (x : α), (u + v) x
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    theorem EReal.iSup_add_le_add_iSup {α : Type u_2} {u : αEReal} {v : αEReal} :
    ⨆ (x : α), (u + v) x (⨆ (x : α), u x) + ⨆ (x : α), v x

    Liminfs and Limsups #

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    theorem EReal.liminf_neg {α : Type u_3} {f : Filter α} {v : αEReal} :
    Filter.liminf (-v) f = -Filter.limsup v f
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    theorem EReal.limsup_neg {α : Type u_3} {f : Filter α} {v : αEReal} :
    Filter.limsup (-v) f = -Filter.liminf v f
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    theorem EReal.add_liminf_le_liminf_add {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} :
    Filter.liminf u f + Filter.liminf v f Filter.liminf (u + v) f
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    theorem EReal.limsup_add_le_add_limsup {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} (h : Filter.limsup u f Filter.limsup v f ) (h' : Filter.limsup u f Filter.limsup v f ) :
    Filter.limsup (u + v) f Filter.limsup u f + Filter.limsup v f
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    theorem EReal.limsup_add_liminf_le_limsup_add {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} :
    Filter.limsup u f + Filter.liminf v f Filter.limsup (u + v) f
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    theorem EReal.liminf_add_le_limsup_add_liminf {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} (h : Filter.limsup u f Filter.liminf v f ) (h' : Filter.limsup u f Filter.liminf v f ) :
    Filter.liminf (u + v) f Filter.limsup u f + Filter.liminf v f
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    theorem EReal.limsup_add_bot_of_ne_top {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} (h : Filter.limsup u f = ) (h' : Filter.limsup v f ) :
    Filter.limsup (u + v) f =
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    theorem EReal.limsup_add_le_of_le {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} {a : EReal} {b : EReal} (ha : Filter.limsup u f < a) (hb : Filter.limsup v f b) :
    Filter.limsup (u + v) f a + b
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    theorem EReal.liminf_add_gt_of_gt {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} {a : EReal} {b : EReal} (ha : a < Filter.liminf u f) (hb : b < Filter.liminf v f) :
    a + b < Filter.liminf (u + v) f
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    theorem EReal.liminf_add_top_of_ne_bot {α : Type u_3} {f : Filter α} {u : αEReal} {v : αEReal} (h : Filter.liminf u f = ) (h' : Filter.liminf v f ) :
    Filter.liminf (u + v) f =
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    theorem EReal.limsup_le_iff {α : Type u_3} {f : Filter α} {u : αEReal} {b : EReal} :
    Filter.limsup u f b ∀ (c : ), b < c∀ᶠ (a : α) in f, u a c

    Continuity of addition #

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    theorem EReal.continuousAt_add_coe_coe (a : ) (b : ) :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) (a, b)
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    theorem EReal.continuousAt_add_top_coe (a : ) :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) (, a)
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    theorem EReal.continuousAt_add_coe_top (a : ) :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) (a, )
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    theorem EReal.continuousAt_add_top_top :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) (, )
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    theorem EReal.continuousAt_add_bot_coe (a : ) :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) (, a)
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    theorem EReal.continuousAt_add_coe_bot (a : ) :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) (a, )
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    theorem EReal.continuousAt_add_bot_bot :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) (, )
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    theorem EReal.continuousAt_add {p : EReal × EReal} (h : p.1 p.2 ) (h' : p.1 p.2 ) :
    ContinuousAt (fun (p : EReal × EReal) => p.1 + p.2) p

    The addition on EReal is continuous except where it doesn't make sense (i.e., at (⊥, ⊤) and at (⊤, ⊥)).

    Negation #

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    instance EReal.instContinuousNeg :
    ContinuousNeg EReal
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    Continuity of multiplication #

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    theorem EReal.continuousAt_mul {p : EReal × EReal} (h₁ : p.1 0 p.2 ) (h₂ : p.1 0 p.2 ) (h₃ : p.1 p.2 0) (h₄ : p.1 p.2 0) :
    ContinuousAt (fun (p : EReal × EReal) => p.1 * p.2) p

    The multiplication on EReal is continuous except at indeterminacies (i.e. whenever one value is zero and the other infinite).